{"record_type":"pith_number_record","schema_url":"https://pith.science/schemas/pith-number/v1.json","pith_number":"pith:2012:4PUIHV3VPZ5CHBEJRAP7AWNH4J","short_pith_number":"pith:4PUIHV3V","schema_version":"1.0","canonical_sha256":"e3e883d7757e7a238489881ff059a7e26c5480367241eaf7983333db29d865c1","source":{"kind":"arxiv","id":"1210.7664","version":1},"attestation_state":"computed","paper":{"title":"Mutually excited random walks","license":"http://arxiv.org/licenses/nonexclusive-distrib/1.0/","headline":"","cross_cats":[],"primary_cat":"math.PR","authors_text":"Eviatar B. Procaccia, Noam Berger","submitted_at":"2012-10-29T13:54:22Z","abstract_excerpt":"Consider two random walks on $\\mathbb{Z}$. The transition probabilities of each walk is dependent on trajectory of the other walker i.e. a drift $p>1/2$ is obtained in a position the other walker visited twice or more. This simple model has a speed which is, according to simulations, not monotone in $p$, without apparent \"trap\" behaviour. In this paper we prove the process has positive speed for $1/21/2$ is obtained in a position the other walker visited twice or more. This simple model has a speed which is, according to simulations, not monotone in $p$, without apparent \"trap\" behaviour. In this paper we prove the process has positive speed for $1/2